Permanent magnet motor

ABSTRACT

A permanent magnet motor comprising a permanent magnet and an armature having a plurality of winding grooves facing the permanent magnet with an air gap therebetween. The armature has a plurality of auxiliary grooves on a magnetic pole surface thereof, wherein a composite vector of vectors of the auxiliary grooves is deviated by 180° or 120° from a vector of the winding grooves in sixth harmonic plane, and wherein a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet is lower than 80% or 86% of an entire width of the wave form. Each of vectors of the auxiliary grooves is deviated by 180° or 120° from a vector of the winding groove in sixth harmonic plane, respectively, and wherein a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet is lower than 80% or 86% of an entire width of the wave form.

BACKGROUND OF THE INVENTION

[0001] 1. Field of the Invention

[0002] The present invention relates to a permanent magnet motor, and more particularly to an electric motor having a permanent magnet and an armature facing the permanent magnet with a gap therebetween, capable of reducing cogging torque.

[0003] 2. Description of the Prior Art

[0004] A conventionally implemented permanent magnet motor, wherein a cogging torque is reduced by providing auxiliary grooves is disclosed in the Japanese Patent Publication No. 79541/95.

[0005] According to such permanent magnet motor, however, the cogging torque cannot be reduced sufficiently.

[0006] (The minimization of cogging torque generated in the groove in the iron core)

[0007] The torque generated in the general electromagnetic machine system can be expressed by Formula 1 under the condition of constant magnetic flux according to the principle of virtual work. $\begin{matrix} {T = {- \frac{\partial W_{m}}{\partial\theta}}} & (1) \end{matrix}$

[0008] Here, W_(m) denotes a total magnetic energy, and θ denotes a rotation angle. The cogging torque will now be considered. The magnetic energy W_(m) due to the permanent magnet is stored in the magnet, the iron core and the air gap portion. The magnetic energy in the magnet is almost constant, and the energy in the iron core is very small because the iron core has a high permeability. Accordingly, a cogging torque T_(c) can be expressed by Formula 2 by the angular differentiation of only a magnetic energy W_(g) in the air gap portion. $\begin{matrix} {T_{C} = \frac{\partial W_{g}}{\partial\theta}} & (2) \end{matrix}$

[0009] In order to simplify, it is assumed that the iron core is rotated, and the magnetic energy is stored in a cylindrical air gap portion entirely, and that a magnetic energy is W_(g) (θ) when the relative angle of the stator and the rotor is θ. The W_(g) (θ) can be expressed by Formula 3 by integration by rotation at the air gap portion. $\begin{matrix} {{W_{g}(\theta)} = {\frac{l_{g}L_{S}r_{g}}{2\quad \mu_{0}}{\oint_{C}{{B_{g}^{2}\left( {\theta + \gamma} \right)}{\gamma}}}}} & (3) \end{matrix}$

[0010] Here, I_(g) denotes an air gap length, L_(s) denotes an effective thickness of iron core, μ₀ denotes a vacuum permeability, r_(g) denotes a mean radius of air gap portion, and B_(g) (θ+γ) denotes a distribution of the magnetic flux density in the air gap with respect to an angle γ in the iron core rotated by an angle θ.

[0011] In case that a smoothed iron core 1 having no winding groove as shown in FIG. 1, no cogging torque due to the rotation is generated because there is no winding groove. Accordingly, the magnetic energy W_(g) (θ) in the Formula 3 is constant having no relation to the rotation angle θ. On the contrary thereto, it is considered that if the winding grooves exist, B_(g) (ξ) or B_(g) ² (ξ) lacks substantially at the angle of γ, so that the cogging torque is generated. Here, ξ=θ+γ. The W_(g) can be expressed by Formulas 4-6, if the lacked magnetic energy due to the winding groove is δ W_(g).

W _(g) =W _(g0) −δW _(g)   (4)

[0012] $\begin{matrix} {{\delta \quad W_{g}} = {\sum\limits_{k = 1}^{s}{w_{g}\left( {\theta + \gamma_{k}} \right)}}} & (5) \\ {{w_{g}\left( {\theta,\gamma_{k}} \right)} = {\frac{l_{g}L_{S}}{2\quad \mu_{0}}k_{sk}{B_{g}^{2}\left( {\theta + \gamma_{k}} \right)}}} & (6) \end{matrix}$

[0013] Here, W_(g) denotes a magnetic energy in the air gap portion of the smoothed iron core, s denotes a number of grooves, γ_(k) denotes an angle of a No. k winding groove, k_(sk) denotes a coefficient determined by a figure of the No. k winding groove, and B_(g) (θ+γ) is a magnetic flux density in the air gap at a position of No. k groove.

[0014] By putting the Formulas 4 to 5 in the Formula 2, the cogging torque can be expressed by Formula 7. $\begin{matrix} {T_{C} = {\frac{\partial\left( {\delta \quad W_{g}} \right)}{\partial\theta} = {\frac{l_{g}L_{S}}{2\quad \mu_{0}}\frac{\partial\quad}{\partial\theta}\left( {\sum\limits_{k = 1}^{s}{k_{sk}{B_{g}^{2}\left( {\theta + \gamma_{k}} \right)}}} \right)}}} & (7) \end{matrix}$

[0015] The right side of the Formula 7 is the sum of magnetic energy portions lost by the winding grooves. It can be said that it is similar to the function of the hole in the semiconductor engineering. Specifically, it can be said that the cogging torque is generated by the reduction of the magnetic energy due to the groove. Accordingly, a manner for reducing the cogging torque is now studied under the point of view as follows.

[0016]FIG. 2 shows results of the distribution of the magnetic flux in the air gap measured by providing a hole element on the surface of the iron core and rotating the iron core, in order to know a figure of B_(g) (ξ). The analysis is proceeded on the assumption that a figure of the distribution of the magnetic flux density in the air gap is shown in FIG. 3 with respect to the electrical angle ξ. β denotes a ratio of an inclined portion. It is supposed that the magnetic flux density is varied as a figure of a fourth part of a sign wave in a term shown in Formula 8.

(0<β≦1)   (8)

[0017] The B_(g) (ξ) can be expressed by Formula 9. $\begin{matrix} {{B_{g}(\xi)}\left\{ \begin{matrix} {= {- 1}} & {{{for}\quad - \frac{\pi}{2}} \leq {p\quad \xi} < {- \frac{\beta \quad \pi}{2}}} \\ {= {\sin \quad \frac{p\quad \xi}{\beta}}} & {{{for}\quad - \frac{\beta \quad \pi}{2}} \leq {p\quad \xi} \leq \frac{\beta \quad \pi}{2}} \\ {= 1} & {{{for}\quad \frac{\beta \quad \pi}{2}} < {p\quad \xi} \leq \frac{\pi}{2}} \end{matrix} \right.} & (9) \end{matrix}$

[0018] The Formula 9 can be expressed by Fourier series in the form of Formula 10 consisting of terms of odd number order. $\begin{matrix} {{B_{g}(\varsigma)} = {\sum\limits_{n = 0}^{\infty}{b_{{2n} - 1}{\sin\left( {\left( {{2n} - 1} \right)p\quad \xi} \right)}}}} & (10) \end{matrix}$

[0019] The coefficient can be expressed by Formula 11 in case of β=0 and by Formula 12 in case of 0<b<1. $\begin{matrix} {b_{{2n} - 1} = \frac{4}{\left( {{2n} - 1} \right)\quad \pi}} & (11) \\ {b_{{2n} - 1} = {\frac{4}{\left( {{2n} - 1} \right){\pi \left( {{\beta^{2}\left( {{2n} - 1} \right)}^{2} - 1} \right)}}\cos \frac{\left( {{2n} - 1} \right)\beta \quad \pi}{2}}} & (12) \end{matrix}$

[0020] In case of β=1, only the fundamental wave is presented.

[0021] B_(g) ² (ξ) can be expressed by Formula 13 which is a even function consisting of terms of even number order. $\begin{matrix} {{B_{g}^{2}(\xi)} = {a_{0} + {\sum\limits_{n = 1}^{\infty}{a_{2n}\cos \quad 2n\quad p\quad \xi}}}} & (13) \end{matrix}$

[0022]FIG. 4 shows the change of each harmonic coefficient a_(2n) of B_(g) ² with respect to β. When β is zero, it becomes a square wave, and when β is 1, it becomes a pure sign wave. The second order component corresponds to the fundamental wave, and becomes larger in value when the order number is smaller in value. The maximum value thereof exists in the middle portion of the change of β.

[0023] By putting the Formula 13 in the Formula 7 Formula 14 can be obtained. $\begin{matrix} \begin{matrix} {T_{C} = {\frac{l_{g}L_{S}}{2\quad \mu_{0}}{\sum\limits_{n = 1}^{\infty}\left\lbrack {\frac{\partial\quad}{\partial\theta}{\sum\limits_{k = 1}^{s}{k_{sk}a_{2n}\cos \quad 2n\quad {p\left( {\theta + \gamma_{k}} \right)}}}} \right\rbrack}}} \\ {= {\frac{l_{g}L_{S}}{\mu_{0}}{\sum\limits_{n = 1}^{\infty}\left\lbrack {\sum\limits_{k = 1}^{s}{n\quad p\quad k_{sk}a_{2n}\sin \quad 2n\quad {p\left( {\theta + \gamma_{k}} \right)}}} \right\rbrack}}} \end{matrix} & (14) \end{matrix}$

[0024] In order to minimize the cogging torque, it is understood that a sum of components due to the winding groove should be set to zero as shown in Formula 15 in the most of the harmonics of low order (n=1, 2, 3 . . . ) which affect largely on the cogging torque. $\begin{matrix} {{\sum\limits_{k = 1}^{3}{{npk}_{sk}a_{2n}\sin \quad 2{{np}\left( {\theta + \gamma_{k}} \right)}}} = {0\quad \left( {n:{{natural}\quad {numeral}}} \right)}} & (15) \end{matrix}$

[0025] This is the principle of minimization of the cogging torque due to the iron core groove. A manner for reducing the cogging torque with respect to the three-phase permanent magnet motor on the basis of the principle is now considered.

[0026] (Minimization of the cogging torque in the three-phase winding groove)

[0027] A recent small motor of non-wrap concentration winding construction shown in FIG. 5 will now be studied. In FIG. 5, a reference numeral 2 denotes an annular four-pole permanent magnet, 3 denotes an armature having six magnetic poles, and 4 denotes six winding grooves.

[0028] Following conditions must be satisfied for the winding grooves to which three-phase windings can be wound.

[0029] (1) A number s of grooves is a multiple number of three.

[0030] (2) Three-phase windings having phase difference of 120° in electrical angle can be formed.

[0031] Here, the component in the Formula 15 is expressed by a plurality of vectors A_(nk) and named as groove vectors.

[0032] The groove vectors A_(nk) can be expressed by Formula 16.

A _(nk)=npk_(sk)α_(2n)ε^(J2npξ) ^(_(k)) ≡A_(n0)ε^(J2npξ) ^(_(k))   (16)

[0033]FIG. 6A shows vectors in the second harmonic plane of the brushless motor shown in FIG. 5 having four-pole permanent magnet and six winding grooves, wherein p=2, s=6 and n=1. FIG. 6B shows vectors in the fourth harmonic plane of the brushless motor shown in FIG. 5 having four-pole permanent magnet and six winding grooves, wherein p=2, s=6 and n=2. It is noted from FIG. 6A and FIG. 6B that every three vectors are balanced and the relation of the Formula 15 is certified. However, in case of n=3, all of the vectors A_(6k) are superposed on the same position of 0°, so that the balance cannot be kept. Accordingly, in this case, a cogging torque is generated by the sixth harmonic.

[0034] In general, all groove vectors are balanced and Formula 15 is established so far as anisotropic vectors dividing equally the electrical angle 4np π of the harmonic order exist, because No. s angle ξ_(x) is 2π (360°) when θ=0. However, the all vectors are superposed in the same direction and not balanced when the distance of the vectors becomes 2π (i is an integer). In such case, Formula 17 is established if s is 3m (m is a natural numeral). $\begin{matrix} {m = {\frac{2{np}}{3i}\quad \left( {{unbalance}\quad {condition}} \right)}} & (17) \end{matrix}$

[0035] The Formula 17 can be applied to the motor having four-pole permanent magnet and six winding grooves, wherein p=2, m=2, n=3 and i=2.

[0036] The unbalance condition expressed by the Formula 17 is obtained when p or n is a multiple number of three. In the above motor, the above condition (2) cannot be obtained some times, and the cogging torque is generated also in case that the n is not a multiple number of three.

[0037] Accordingly, a combination in which the Formula 17 cannot be established when n is three or a multiple number of three should be selected, in order to reduce the cogging torque.

[0038] Table 1 shows a representative example of combinations of the number of the winding grooves and the number of the magnetic poles for minimizing the cogging torque obtained from the above, with respect to the non-wrap concentration winding shown in FIG. 5 which is excellent windings for the permanent magnet motor. No combination for minimizing the cogging torque exists, because no cogging torque due to the sixth harmonic is generated when the groove number is not more than six. A combination of two grooves and three magnetic poles or three grooves and four magnetic poles used conventionally cannot be said as a combination for minimizing the cogging torque. TABLE 1 cogging torque grove magnetic pole reduction number number 6 order 12 order  9 8,10 ◯ ◯ 12 10,14 ◯ X 15 14,16 ◯ ◯ 18 16,20 ◯ ◯ 21 20,22 ◯ ◯ 24 20,22,26,28 ◯ X, ◯

[0039] Table 1 shows the judgment of the cogging torque balance of twelveth order which should be considered next of the sixth order, wherein cases of the magnetic pole numbers 20 and 28 with the groove number 24 are × (bad), and cases of the magnetic pole numbers 22 and 26 with the groove number 24 are ◯ (good).

[0040]FIG. 7A shows relations of vectors in the sixth harmonic with respect to a motor having twelve winding grooves and ten poles (12-S/10-P), and FIG. 7B shows that with respect to a motor having nine winding grooves and eight poles (9-S/8-P).

[0041] In the motor shown in FIG. 7A, vectors are concentrated in two vectors deviated by 180° from each other and balanced, whereas in the motor shown in FIG. 7B, vectors are concentrated in three vectors deviated by 120° from one another and balanced.

[0042] Combinations of a small groove number and a small magnetic pole number, which are not included in the Table 1 are studied. In this case, the cogging torque is generated because all groove vectors in the sixth harmonic plane are aligned on a line of zero phase. Accordingly, it is effective to provide auxiliary grooves in positions at which the groove vectors are balanced.

[0043] It is considered that (a) the auxiliary grooves are provided in opposite phase positions, and (b) the auxiliary grooves are provided in positions deviated by 120° from one another in consideration of FIG. 7A and FIG. 7B. In the case (a), Formula 18 is established if an angle between the winding groove and the auxiliary groove is ξ. $\begin{matrix} {\zeta = {{\pm \frac{\left( {{2i} + 1} \right)\pi}{6p}}\quad \left( {i:{integer}} \right)}} & (18) \end{matrix}$

[0044] Here, i is an integer.

[0045] Similarly, in the case (b), Formula 19 is established. $\begin{matrix} {{\zeta = {\pm \frac{\left( {i + {1/3}} \right)\pi}{3p}}}\quad} & (19) \end{matrix}$

[0046] Representative examples of the auxiliary groove position ξ according to the Formulas 18 and 19 are shown in Table 2. TABLE 2 magnetic (a) opposite position (b) 120° position pole number [Formula (17)] [Formula (18)] 2p i = 0 i = 1 i = 0 i = 1  2 π/6 (30°) π/2 (90°) π/9 (20°) 4 π/9 (80°)  4 π/12 (15°) π/4 (45°) π/18 (10°) 4 π/18 (40°)  6 π/18 (10°) π/6 (30°) π/27 (6.7°) 4 π/27 (26.7°)  8 π/24 (7.5°) π/8 (22.5°) π/36 (5°) 4 π/36 (20°) 10 π/6 (30°) π/12 (15°) π/45 (4°) 4 π/45 (16°)

[0047] In the case according to the Formula 19, it is necessary to provide the auxiliary grooves in both (+) and (−) angular positions, in order to balance the three vectors.

[0048]FIG. 8A shows an representative example of a magnetic pole surface 5 of an armature 3 with auxiliary grooves 6 of a motor having six winding grooves and four pole s. FIG. 9A shows a vector relation of this case. In FIG. 9A, a groove vector AS corresponds to a winding groove, and groove vectors AG1 and AG2 correspond to auxiliary grooves G1 and G2, respectively.

[0049] In general, it is aimed to cancel the effect of one winding groove by two auxiliary grooves, because the auxiliary groove is smaller in width and depth than the winding groove. Specifically, as shown in FIG. 8A, the positions of the auxiliary grooves G1 and G2 are deviated by (+) 15° and (−) 15° from the position of the winding groove, respectively, so that the positions of the auxiliary grooves are deviated by 180° (6p times) from the position of the winding groove in the sixth harmonic plane, and that the auxiliary vectors are canceled by the groove vector.

[0050] Further, as apparent from FIG. 9A, a composite vector of two auxiliary groove vectors should be balanced to the groove vector. Accordingly, it is sufficient that the sum of the vectors is positioned in the balanced position, even if the angular position of one vector is larger than a predetermined angular position and the angular position of the other vector is smaller than the predetermined angular position.

[0051] In FIG. 9A, the direction of the composite vector is not varied, because even if the angular positions of the auxiliary grooves G1 and G2 in FIG. 8A, are varied by a value from the predetermined position, the positions of the groove vectors AG1 and AG2 are varied by the same value in the opposite directions. If the auxiliary grooves are shifted from the predetermined positions, the composite vector becomes small, and accordingly the value of the shift should be limited.

[0052]FIG. 8A shows the motor having four magnetic poles, however, it is possible to balance the groove vector with a sum of four vectors by providing four small grooves in case of eight magnetic poles, because it is possible to provide four auxiliary groove positions in the Table 2.

[0053]FIG. 8B shows an example of a magnetic pole surface 5 of an armature 3 with other auxiliary grooves 6 of a motor having six winding grooves and four poles. FIG. 9B shows a vector relation of this case. In FIG. 9B, a groove vector AS corresponds to a winding groove, and groove vectors AG1, AG2, AG3 and AG4 correspond to auxiliary grooves G1, G2, G3 and G4, respectively. In general, it is aimed to cancel the effect of one winding groove by two auxiliary grooves, because the auxiliary groove is smaller in width and depth than the winding groove. Specifically, as shown in FIG. 8B, the positions of the auxiliary grooves G1 and G4 are deviated by (+) 10° and (−) 10° from the position of the winding groove, respectively, and the auxiliary grooves G3 and G2 are deviated by (+) 40° and (−) 40° from the position of the winding groove, respectively, so that the positions of the auxiliary grooves are deviated by ±120° and ±240° ( 6p times ) from the position of the winding groove in the sixth harmonic plane, and that the auxiliary vectors are canceled by the groove vector.

[0054] In FIG. 8B, even if the angles of the auxiliary grooves G1 and G4 are set smaller a little than the predetermined angles and the angles of the auxiliary grooves G2 and G3 are set larger a little than the predetermined angles, the balance conditions are still maintained, if a position of the composite vector of them is the predetermined position.

[0055] (Inspection by FEM Magnetic Filed Analysis)

[0056] The method of reducing the cogging torque generated by the magnetic poles and the iron core grooves is studied as mentioned above. A representative motor will now be inspected by the magnetic field analysis based on the second dimension finite element method (FEM). The cogging torque is calculated by the Maxwell stress method while rotating the rotor by an angle corresponding to one magnetic pole. In order to increase the precision of the calculation, triangle meshes for dividing the air gap portion equally with intervals of 1° or 0.5° in the peripheral direction thereof and for dividing into three layers in the radial direction thereof are used.

[0057] The Maxwell stress is calculated by using a mean value of the magnetic flux densities of the triangle elements adjacent to each other in the radial direction at the air gap center.

[0058] The motor shown in the Table 1 is of multipoles more than eight poles, however, a magnetic pole number less than eight poles may be required for the motor of high speed, low cost and high efficiency. In such case, it is preferable to provide the above mentioned auxiliary grooves. A motor having six winding grooves and four magnetic poles will now be examined.

[0059] The cogging torques of the motors shown in FIG. 8A and FIG. 8B were calculated in consideration that the permanent magnet was magnetized uniformly in the radial direction. However, any effect could not be observed against our expectations. Accordingly, a calculation was carried out by reducing the magnetic strength at both ends of the magnet along the curve of sign wave as shown in FIG. 3 in order to reduce the sixth and twelveth harmonic energies. The results are shown in FIG. 10A and FIG. 10B.

[0060] It is apparent that any effective result cannot be obtained unless the inclined portion rate β is increased more than 30% with respect to the auxiliary grooves shown in FIG. 8A. It is difficult to magnetize in practice in the state that the inclined portion rate β is zero. It is supposed that the inclined portion rate β is about 20% in case that a magnetized yoke is used. Accordingly, it is necessary to determine a magnetizing pattern so as to have a necessary inclined portion according to the auxiliary groove system. FIG. 11A shows cogging torque wave forms in case that the inclined portion rate β of the magnetic wave form is 30%. Pulses of sixth harmonic are generated in case that the auxiliary groove is not formed, and pulses of twelveth harmonic are generated in case that the auxiliary groove is formed. The consideration coincides with the consideration about the energy balance by the auxiliary groove.

[0061] The above calculation was carried out with respect to the motor wherein the magnet is an outer rotor. Similar results can be obtained with respect to the motor wherein the magnet is an inner rotor as shown in FIG. 12. It is considered that the auxiliary groove system is optimum to a case that pole-magnetized magnet of inner rotor type generating an air gap magnetic field distribution similar to a sign wave is used. The pole-magnetized magnet is a magnet magnetized along the magnetic flux flow as shown in FIG. 12.

[0062] The invention disclosed in the Japanese Patent Publication No. 79541/95 corresponds to the above auxiliary groove system, however, any effect of the auxiliary groove is not recognized in a state that β is less than 20%, that is, a normal magnetized state as shown in FIG. 10A. The effect of the auxiliary groove can be recognized in a state that β is more than about 30%. In other words, a large effect can be obtained in a range that an area of a value more than 90% of the peak value of the magnetic wave form is less than 80% of an entire area of the magnetic wave form.

[0063] It is apparent that any effective result cannot be obtained unless the inclined portion rate β is increased more than 20% with respect to the auxiliary grooves shown in FIG. 8B. It is difficult to magnetize in practice in the state that the inclined portion rate β is zero. It is supposed that the inclined portion rate β is about 20% in case that a magnetized yoke is used. Accordingly, it is necessary to determine a magnetizing pattern so as to have a necessary inclined portion according to the auxiliary groove system. FIG. 11B shows cogging torque wave forms in case that the inclined portion rate h of the magnetic wave form is 30%.

[0064] Pulses of sixth harmonic are generated in case that the auxiliary groove is not formed, and pulses of 18th harmonic are generated in case that the auxiliary groove is formed. The consideration coincides with the consideration about the energy balance by the auxiliary groove.

[0065] The above calculation was carried out with respect to the motor wherein the magnet is an outer rotor. Similar results can be obtained with respect to the motor wherein the magnet is an inner rotor as shown in FIG. 12. It is considered that the auxiliary groove system is optimum to a case that pole-magnetized magnet of inner rotor type generating an air gap magnetic field distribution similar to a sign wave is used.

[0066] Any, effect of the auxiliary groove is not recognized in a state that β is less than 10%, that is, a normal magnetized state as shown in FIG. 10B. The effect of the auxiliary groove can be recognized in a state that β is more than about 20%. In other words, a large effect can be obtained in a range that an area of a value more than 90% of the peak value of the magnetic wave form is less than 86% of an entire area of the magnetic wave form.

[0067] The present invention can be obtained based on the above considerations.

SUMMARY OF THE INVENTION

[0068] An object of the present invention is to provide a permanent magnet and an armature having a plurality of winding grooves facing the permanent magnet with an air gap therebetween, the armature having a plurality of auxiliary grooves on a magnetic pole surface thereof, wherein a composite vector of vectors of the auxiliary grooves is deviated by 180° from a vector of the winding grooves in sixth harmonic plane, and wherein a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet is lower than 80% of an entire width of the wave form.

[0069] Another object of the present invention is to provide a permanent magnet and an armature having a plurality of winding grooves facing the permanent magnet with an air gap therebetween, the armature having a plurality of auxiliary grooves on a magnetic pole surface thereof, wherein each of vectors of the auxiliary grooves is deviated by 180° from a vector of the winding groove in sixth harmonic plane, respectively, and wherein a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet is lower than 80% of an entire width of the wave form.

[0070] A further object of the present invention is to provide a permanent magnet and an armature having a plurality of winding grooves facing the permanent magnet with an air gap therebetween, the armature having a plurality of auxiliary grooves on a magnetic pole surface thereof, wherein composite two vectors of vectors of the auxiliary grooves are deviated by 120° from a vector of the winding grooves in sixth harmonic plane, and wherein a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet is lower than 86% of an entire width of the wave form.

[0071] Yet further object of the present invention is to provide a permanent magnet and an armature having a plurality of winding grooves facing the permanent magnet with an air gap therebetween, the armature having a plurality of auxiliary grooves on a magnetic pole surface thereof, wherein each of vectors of the auxiliary grooves are deviated by 120° from a vector of the winding groove in sixth harmonic plane, respectively, and wherein a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive forece wave form formed by the permanent magnet is lower than 86% of an entire width of the wave form.

[0072] The permanent magnet is an inner rotor made of a pole-magnetized magnet.

[0073] The forgoing and other objects, features, and advantages of the present invention will become apparent from the following more particular description of preferred embodiments of the invention, as illustrated in the accompanying drawings.

BRIEF DESCRIPTION OF THE DRAWINGS

[0074]FIG. 1 is a vertically sectional front view of a smoothed iron core model having no groove.

[0075]FIG. 2 is a graph showing an air gap magnetic flux distribution of a permanent magnet motor having ten poles.

[0076]FIG. 3 is a view explaining an air gap magnetic flux density distribution of the smoothed iron c(ore model shown in FIG. 1.

[0077]FIG. 4 is a graph showing an inclined portion rate of the magnetic flux density distribution.

[0078]FIG. 5 is a vertically sectional front view of a non-wrap concentration winding permanent magnet motor.

[0079]FIG. 6A shows groove vectors in secondary harmonic plane of the motor shown in FIG. 5.

[0080]FIG. 6B shows groove vectors in fourth harmonic plane of the motor shown in FIG. 5.

[0081]FIG. 7A shows vectors in sixth harmonic space of a motor having twelve winding grooves and ten poles.

[0082]FIG. 7B shows vectors in sixth harmonic space of a motor having nine winding grooves and eight poles.

[0083]FIG. 8A is a view explaining auxiliary groove position of a motor having six winding grooves and four poles.

[0084]FIG. 8B is a view explaining auxiliary groove position of a motor having six winding grooves and four poles.

[0085]FIG. 9A shows vectors of winding grooves and auxiliary grooves of the motor shown in FIG. 8A.

[0086]FIG. 9B shows vectors of winding grooves and auxiliary grooves of the motor shown in FIG. 8B.

[0087]FIG. 10A is a graph showing the relation between the auxiliary grooves and the cogging torque.

[0088]FIG. 10B is a graph showing the relation between the auxiliary grooves and the cogging torque.

[0089]FIG. 11A is a graph showing wave forms of the cogging torque in case that the auxiliary grooves are provided.

[0090]FIG. 11B is a graph showing wave forms of the cogging torque in case that the auxiliary grooves are provided.

[0091]FIG. 12 is a vertically sectional front view of a motor having a pole-magnetized magnet as an inner rotor.

DESCRIPTION OF THE PREFERRED EMBODIMENTS

[0092] The present invention relates to a permanent magnet motor comprising as shown in FIG. 5 a permanent magnet 2 having four poles, and an armature 3 having six winding grooves 4 facing the permanent magnet 2 with an air gap therebetween. As shown in FIG. 8A, two auxiliary grooves 6 are provided at positions G1 and G2 on a magnetic pole surface 5 of the armature 3, so that a composite vector of vectors of the auxiliary grooves 6 is deviated by 180° from a vector of the winding groove 4 in sixth harmonic plane, and that a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet 2 is lower than 80% of an entire width of the wave form.

[0093] A permanent magnet motor of another embodiment of the present invention, as shown in FIG. 5, comprises a permanent magnet 2 having four poles, and an armature 3 having six winding grooves 4 facing the permanent magnet 2 with an air gap therebetween. As shown in FIG. 8A, two auxiliary grooves 6 are provided at positions G1 and G2 on a magnetic pole surface 5 of the armature 3, so that each of vectors of the auxiliary grooves 6 is deviated by 180° from a vector of the winding groove 4 in sixth harmonic plane, and that a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet 2 is lower than 80% of an entire width of the wave form.

[0094] A permanent magnet motor of a further embodiment of the present invention comprises, as shown in FIG. 5, a permanent magnet 2 having four poles, and an armature 3 having six winding grooves 4 facing the permanent magnet 2 with an air gap therebetween. As shown in FIG. 8B, four auxiliary grooves 6 are provided at positions G1 to G4 on a magnetic pole surface 5 of the armature 3, so that composite two vector of vectors of the auxiliary grooves 6 are deviated by 120° from a vector of the winding groove 4 in sixth harmonic plane, and that a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet 2 is lower than 86% of an entire width of the wave form.

[0095] A permanent magnet motor in the other embodiment of the present invention, as shown in FIG. 5, comprises a permanent magnet 2 having four poles, and an armature 3 having six winding grooves 4 facing the permanent magnet 2 with an air gap therebetween. As shown in FIG. 8B, four auxiliary grooves 6 are provided at positions G1 to G4 on a magnetic pole surface 5 of the armature 3, so that each of vectors of the auxiliary grooves 6 is deviated by 120° from a vector of the winding groove 4 in sixth harmonic plane, and that a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet 2 is lower than 86% of an entire width of the wave form.

[0096] A pole-magnetized magnet of inner rotor type may be used instead of the permanent magnet 2.

[0097] As stated above, according to the permanent magnet of the present invention, the cogging torque can be reduced by a simple construction, and the frequency of the magnetic flux becomes lower, so that the motor can be used as a high speed motor having a lower oscillation and a higher efficiency.

[0098] While the invention has been particularly shown and described with reference to the preferred embodiments thereof, it will be understood by those skilled in the art that various changes in form and details may be made therein without departing from the spirit and scope of the invention defined by the appended claims. 

What is claimed is:
 1. A permanent magnet motor comprising a permanent magnet and an armature having a plurality of winding grooves facing the permanent magnet with an air gap therebetween, the armature having a plurality of auxiliary grooves on a magnetic pole surface thereof, wherein a composite vector of vectors of the auxiliary grooves is deviated by 180° from a vector of the winding grooves in sixth harmonic plane, and wherein a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet is lower than 80% of an entire width of the wave form.
 2. A permanent magnet motor comprising a permanent magnet and an armature having a plurality of winding grooves -facing the permanent magnet with an air gap therebetween, the armature having a plurality of auxiliary grooves on a magnetic pole surface thereof, wherein each of vectors of the auxiliary grooves is deviated by 180° from a vector of the winding groove in sixth harmonic plane, respectively, and wherein a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet is lower than 80% of an entire width of the wave form.
 3. A permanent magnet motor comprising a permanent magnet and an armature having a plurality of winding grooves facing the permanent magnet with an air gap therebetween, the armature having a plurality of auxiliary grooves on a magnetic pole surface thereof, wherein composite two vectors of vectors of the auxiliary grooves are deviated by 120° from a vector of the winding grooves in sixth harmonic plane, and wherein a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive force wave form formed by the permanent magnet is lower than 86% of an entire width of the wave form.
 4. A permanent magnet motor comprising a permanent magnet and an armature having a plurality of winding grooves facing the permanent magnet with an air gap therebetween, the armature having a plurality of auxiliary grooves on a magnetic pole surface thereof, wherein each of vectors of the auxiliary grooves are deviated by 120° from a vector of the winding groove in sixth harmonic plane, respectively, and wherein a width of a wave form portion of a value more than 90% of a peak value of a magnetomotive forece wave form formed by the permanent magnet is lower than 86% of an entire width of the wave form.
 5. The permanent magnet motor as claimed in claim 1, wherein the permanent magnet is an inner rotor made of a pole-magnetized magnet.
 6. The permanent magnet motor as claimed in claim 2, wherein the permanent magnet is an inner rotor made of a pole-magnetized magnet.
 7. The permanent magnet motor as claimed in claim 3, wherein the permanent magnet is an inner rotor made of a pole-magnetized magnet.
 8. The permanent magnet motor as claimed in claim 4, wherein the permanent magnet is an inner rotor made of a pole-magnetized magnet. 